2. Content Introduction Formula Deviation method
Type 1 problems: Combined average
General equation
Balance method
Type 2 problems: Change in average
Equal distribution method

3. 1) INTRODUCTION What is an average ??
Average of n values is equal to the sum of n values divided by the total number of values (n) Averages = Sum of Observations /Number of Observation Avg = Sum/n

4. 1.i Formula Numbers Sum Average (Sum/n) First n numbers n(n+1)/2
First n odd numbers
n^2 n
First n even numbers
n(n+1)
(n+1)
First n square numbers
n(n+1)(2n+1)/6
(n+1)(2n+1)/6
Consecutive numbers
n(first term + last term)/2
(first term + last term)/2

5. Note: Average of consecutive numbers can also be written as (2nd term + 2nd last term)/2 or (3rd term + 3rd last term)/2 and so on. For odd number of consecutive values, the middle term will be the average.

6. Example 1.Find the average of following number
1, 3, 5, 7, 9, 11, 13, 15, 17, 19, 21
A) 9
B) 11
C) 12
D) 13

7. Example 2. The average of 20 numbers is zero
Example 2. The average of 20 numbers is zero. Of them, at the most, how many may be greater than zero?
A) 0
B) 1
C) 10
D) 19

8. Example 3. The average of 7 consecutive numbers is 20
Example 3. The average of 7 consecutive numbers is 20. The largest of these numbers is :
A)27
B)26
C)24
D)23

9. 1.Ii DEVIATION METHOD
Example: Find the average of 20,23,28,24,25 Assume any number as the average, say 25. Find the deviation for all the given values. Numbers Deviation Total deviation - -5 Average deviation - -5/5 (total/n) = -1 Final average = assumed average + average deviation = 25 + (-1) = 24

10. Note: It is better to assume the average between the highest value and the lowest value because it will always be between them.

11. Example 4. Find the Averages of 61,70,67,77,103,90 A)78 B)88 C)98 D)None
Ans 78

12. 2) TYPE 1 PROBLEMS COMBINED AVERAGE
Class A
Class B
100
What is the combined average?
50 marks?? NO
We cannot determine the average without knowing the number of
students in each class
The combined average depends on the number of students and the average in each class

13. Example: There are 36 students in class A whose average is 30kg and 24 students in class B whose average is 40kg. What will be the average if the classes are combined?
2.i General equation
Avg36= 30, Avg24 = 40
Total weight of class A = 30 x 36
Total weight of class B = 40 x 24
Overall average = (Total weight of class A) + (Total weight of class B) / Number of students in class A + Number of students in class B
= (30 x 36) + (40 x 24) /
= 34

14. Avgc – combined average
2.Ii BALANCE METHOD:
The principle of this concept is that the weight in the balance is inversely proportional to the distance of the pivot.
Where,
Wa – Class A weight Wb – Class B weight
Avga – Class A average Avgb – Class B average
Avgc – combined average Wa Wb
Avga
Avgc
Avgb

15. There are 36 students in class A whose average is 30kg and 24 students in class B whose average is 40kg. What will be the average if the classes are combined? Step 1: Find the ratio of the weights of A and B = 36:24 = 3:2 Step 2: Inverse the weights to get the distance ratio = 2:3 36 24
3:2 30 40 36
3:2 24 30 40
2:3

16. Step 3: Split the distance between the averages in the ratio 2:3 Here the distance from 30 to 40 is 10. So 10 should be split in the ratio 2:3 as 4 and 6. The combined average is (30+4) or (40-6) = 34 36
3:2 24 30 34 40 4 6
2:3

17. Note: Of these 5 values any one can be unknown which we have to find using the other 4 values.

18. Example 5. In class A there are 63 students whose average is 32, and in class B there are 21 students whose average is 44 , then find the overall average? A)33 B)35 C)36 D)38

19. Example 6. In a first 10 overs cricket game run rate was 3. 2
Example 6. In a first 10 overs cricket game run rate was 3.2. what should be run rate in the remaining 40 overs to reach the target 282 runs? A)6.25 B)6.5 C)6.75 D)7

20. 3) TYPE 2 PROBLEMS Change in average
Example: Average of 5 students marks is 30. If one student having 90 mark is added to the team then what will be the new average ?
3.i General equation
Avg = 30
No of students = 5
Sum = 30x5
= 150
Sum =
= 240
Avg = 240/6
= 40

21. 3.Ii EQUAL DISTRIBUTION method:
All the problems in this concept are solved by assuming all the values as average itself.
Step1: Assume all the values to be 30.
If the new mark is also 30 then the average will remain the same.
Step2: Finding the extra values-
But the actual new mark is 90, which means extra 60 is added to the values. 90 30 30
+60

22. ∴ the new average is 40 Step3: Distributing the extra values equally-
The extra 60 should be divided equally among 6 values as 10 each.
∴ the new average is 40

23. Example 7. Average of 4 students marks is 50 and one student having marks has 200, is added to the team , what is new average ? A)70 B)80 C)90 D)None

24. Example 8. Average of 6 students marks is 60 , what is the new average if a student of marks 110 is taken out ?
A50
B)55
C)60
D)None

25. ∴ New values, n+1 = 6 *If the number of values is unknown: Avgn = 30
New number= 90
Old values ……. ……
New values …….
Total extra value added is 60 ( )
This 60 is divided as 10 each which means there should be 60/10 = 6 values
∴ New values, n+1 = 6
Old values, n = 5

26. Example 9. A batsman having average 40 makes 90 runs in his last inning thereby his average increases by 2. Find the number of matches he has played. A)10 B)50 C)25 D)24

27. ∴ Avg5, x = 30 *If the average is unknown: Avg5 = x Avg6 = x+10
New number= 90
Old values x x x x x
New values x+10 x+10 x+10 x+10 x+10 x+10
Total extra value added is 60 (6 x 10)
This 60 is being increased because of the new number 90 which means the initial value has to be 30.
∴ Avg5, x = 30
Avg6, x+10 = 40 x
New number

28. Example 10. The average marks of 12 students increases by 3 if a new student having mark 79 is included. The average mark of the students is?
A) 37
B) 40
C) 43
D) 82

29. ∴ the new number should be 30 + 60 = 90
*If the new number is unknown:
Avg5 = 30
Avg6 = 40
New number= ?
Old values
New values
Total extra value added is 60 (6x10)
Already the number has to be 30 to maintain the average.
∴ the new number should be = 90 30
New number

30. Example 11. The average weight of 8 men having average weight 40 kg is increased by 2 kg when a new man is included. The weight of the new man is
A) 56
B) 58
C) 96
D) 98